Mathematics - 2013-09-29 (page 2 of 4)

Danny

18:05

anyone that can help me with some proof in rudin

twink

Twink

yes?

Danny

well

Twink

which proof?

Danny

it is theorem 3.7 in walter rudin

The subsequential limits of a sequence P_n in a metric space X form a closed subset of X

Twink

and which part don't you understand?

Danny

18:13

is it possible to write with latex code here $\{p_n\}$

no i guess not

well

he says that P_ni converges to q therefore q is in E^*

last sentence

are you with me?

Twink

yes

he constructed a subsequence that converges to $q$

so $q$ is a subsequential limit

Danny

yes..

yes

but

Fernando Martin

@PedroTamaroff: I'm so sorry

Danny

does this say that q is in E^*

Twink

yes because $E^*$ is the set of subsequential limits

and $q$ is a subsequential limit

that means $q$ is an element of $E^*$

Danny

18:18

hold on ..

Twink

@FernandoMartin why are you so sorry?

Fernando Martin

I got Pedro into this cookie game.

Ted Shifrin

Yes, @Fernando, it seems you should be very sorry!

Twink

what happened?

Fernando Martin

I am, I am!

Danny

18:19

so he first assumed that q is a limit point of E^*

Ted Shifrin

@Danny: You can type LaTeX, and it you click on the $\LaTeX$ in chat link on the right, you'll get instructions to see it appear all processed :P

@Fernando: It's almost as bad as @Pedro first dragging me into this chatroom months ago.

Twink

yes Danny

Danny

ok hold

Ted Shifrin

Hi @Twink

Twink

a set is closed if and only if it contains all its limit points

hi @TedShifrin

so he took a limit point of $E^*$

and showed it's contained in $E^*$

Danny

18:21

yes but he first assumed that q was a limit point and then showed that it is in E^*

Twink

yes

Danny

thanks twink!

Ted Shifrin

I don't have Rudin here with me, but it seems that you want a diagonal argument to construct a new subsequence with $q$ as its limit.

confused

Danny

hold on guys i could not find the latex button

Ted Shifrin

do you see the link to the right of Etiquette guidelines on the right, @Danny?

Twink

18:24

but what did @FernandoMartin do to @PedroTamaroff ?

I don't understand

Ted Shifrin

got him hooked on some intrepid game

Twink

and why should he be sorry?

Pedro can decide to play the game or not

Ted Shifrin

because now @Pedro is addicted to something stupid :D

Twink

LOL

Ted Shifrin

ah, well, addictions are sometimes out of one's control

but I have to go prepare my course, so I'm getting out of this place :P

Danny

18:26

$\epsilon$

Ted Shifrin

yes, @Danny, that's an $\epsilon$ ... although I prefer $\varepsilon$ :D

Fernando Martin

@Twink: once you play, you can't just decide to stop playing

Danny

hehe

Twink

lol

Danny

$\epsilon$

but

why

Ted Shifrin

18:27

So, @Fernando, we have to punish you by not answering 10 of your math questions.

Twink

poor Pedro

:(

Fernando Martin

:(

Ted Shifrin

It's ok, @Fernando. You didn't really like differential geometry, anyhow :D

Danny

render mathjax works but not start mathjax

$\theta$

Fernando Martin

Haha, I know nothing about differential geometry. Can't say I dislike it.

Danny

18:28

weiii

were you guys from?

Ted Shifrin

Did you drag the link into your bookmark bar, @Danny?

Danny

but i think it works now

Ted Shifrin

Ah, ok. It look me a long time to get it to work on my iPad, but I got it there finally, too.

Lots of folks from Europe and South America — oh yeah, and Australia — are around here, @Danny. There's a few of us from the US from time to time.

Danny

Iam from sweden Ted shifrin

Ted Shifrin

Very cool, @Danny. That's a country I've always wanted to visit.

Danny

18:31

hehe yeah, nothing special to see execept for a lot of beautiful girls

many Phd:s here

Ted Shifrin

LOL ... I had a very beautiful Danish girl who was an exchange student here and in my classes for a year back about 25 years ago. She was phenomenally brilliant, too. All the guys stayed in the class all year to "work" with her :D

Danny

haha

Fernando Martin

Does anyone know a nice text on CW-complexes?

Ted Shifrin

And, come to think of it, a very brilliant, handsome Danish guy a few years before that. He's now world famous — and turned out to be gay :)

Danny

Ted are you a genious

Ted Shifrin

18:34

Um, no, @Danny, I don't believe so. But I'm not stupid :P

Danny

i have a really hard time with basic math .. iam doing Real analysis now

iam working my ass off

Ted Shifrin

I don't know of a text that focuses just on CW complexes, @Fernando. They're usually part of an algebraic topology or differential topology course/book.

Real analysis is hard, @Danny, and Rudin is not a book that is easily digested.

Danny

but i saw your profile you are a teacher?

Ted Shifrin

But some profs insist on using it, because that's how they were raised. (For example, I was taught out of that book 40+ years ago.)

Danny

at the university

Ted Shifrin

18:35

Yes, @Danny, I am.

Danny

in what subject Ted

Ted Shifrin

well, math, obviously :D

Danny

yeah i mean

hehe

well, there are many branches in math

Ted Shifrin

I teach all sorts of things, but recently every year I have been teaching a multivariable calculus/analysis/linear algebra combined course that I created. Also taught abstract algebra last year, differential geometry this year.

Danny

Twink by the way thank you!

wow

differential geometry sound tough

Ted Shifrin

18:37

@Danny: Rudin is very tough. There are more accessible real analysis books you can certainly find ... for example, one with pictures :D

Danny

;)

Fernando Martin

@TedShifrin: Ok, thanks! Any suggestions? I have seen Spanier's book on algebraic topology on my uni's library.

Ted Shifrin

NOOOOO @ Spanier. It's like Rudin. Unreadable.

Danny

Ted so you are a PHD student

Fernando Martin

Haha, ok. What would you suggest?

Danny

18:38

sorry

have been

Ted Shifrin

Munkres wrote a much more readable book on homology/cohomology (no fundamental group stuff) that talks about it. Hatcher's topology book is all the rage now, and you can download a .pdf free from his webpage.

No, no, @Danny. I finished my Ph.D. in 1979. I'm old.

Fernando Martin

@TedShifrin: Thanks, will look them up!

Ted Shifrin

@Fernando: Hatcher requires maturity to read, but he has the best exercises I've ever seen in any algebraic topology text.

Danny

yes ok Ted

i really look up to people that are good at math

beacuse i know how tough it is

Twink

@TedShifrin do you like the joke in my profile? :D xD

Danny

18:45

by the way twink

when he writes choose $n_i$ such that $p_n{^i}$

Ted Shifrin

Um, I'm not sure I get it entirely, @Twink.

Danny

such that..

$p_n^i \neq q$

in the parenthesis he writes that if no such $n_i$ exist then $E^*$ han only one point

Twink

they're just saying Robin is Batman's boyfriend Ted xD

Danny

does he mean that no subsequence converges

to any other point than $q$

Twink

he means that if there wasn't such $n_i$

Danny

18:50

yes...

Twink

the sequence would be $(q,q,q,...)$

so it would converge to $q$

Ted Shifrin

See you guys later. I have work to do :) Have fun!

Twink

and $q$ would be in $E^*$

Danny

ok bye Ted

Twink

that's why there's nothing to prove

Ciao Ted

Fernando Martin

18:51

Thanks for your help @Ted. See you!

Danny

yes i got it twink !!!

Ted Shifrin

See you, @Fernando.

Danny

twink can i bother you a little more?

i have some other question on another proof

Twink

sure

Danny

it is theorem 3.17

give me a second so i can formulate my question..

Kevin Driscoll

18:55

Looking at the stars, I see Ted emphatically disagreed with someone

Twink

with who?

Kevin Driscoll

I don't know

Twink

why do you think that?

Kevin Driscoll

its right over there ---------------------->

Twink

"NO" xD

@KevinDriscoll thanks for unignoring me :$

Danny

18:59

okey now, it is 3.17 (b) ,

will $s_n$ converge

to $y$

and why?

Kevin Driscoll

I frequently ignore/unignore you depending on how I'm feeling and whats being said

Charlie

Hello

Kevin Driscoll

howdy Charlie

Danny

hi

Charlie

@KevinDriscoll fine and you?

@Danny hi Danny, how.are you?

Kevin Driscoll

19:03

@Charlie doing well, just trying to wake up and get some work done while I watch football

Danny

iam fine thanks charlie!!

Charlie

@KevinDriscoll ah, interesting :)

Danny

twink are you there

Charlie

@Danny good :D

Twink

yes

Danny

19:04

do you know what i mean

Twink

not $s_n$

but a subsequence of $s_n$ would converge to $y$

Danny

ok yeah some subsequence of sn

ofcourse

but!

how do i know that a subsequence of $p_n$ converges?

sorry $s_n$

Charlie

@alizter

Pedro Tamaroff

@FernandoMartin LAWL @TedShifrin

Kevin Driscoll

@pedro Welcome back

Charlie

19:08

Pedro nicolás

Pedro Tamaroff

@Charlie Yiss?

Kevin Driscoll

Now that we somehow convinced him to change his name to Pedro, I think we should start calling him Pyotr

Charlie

@PedroTamaroff how are you?

Pedro Tamaroff

@KevinDriscoll Pyotr Nikolai.

Kevin Driscoll

@Pedro Tamarrof not Russian enough for you?

Pedro Tamaroff

19:10

@KevinDriscoll Tamaroff.

Kevin Driscoll

or is that your middle name?

Pedro Tamaroff

I think one can write it as Tamarov.

Nah, that's my surname.

Charlie

Good to know you'ree fine

Twink

@Danny because there are infinetely many points to the right of $x$

Pedro Tamaroff

@Charlie You so silly. I was about to answer.

Twink

19:10

points of the sequence

Pedro Tamaroff

I had a good coffee and now feeling good.

I had a little headache because I had no coffee when I woke.

Charlie

@PedroTamaroff I asked you first, but you answered.kevin firstly >:(

Kevin Driscoll

@Pedro Coffee in the afternoon? Someone mustve been sleepy.

Pedro Tamaroff

@Charlie *first.

Danny

is there any theorem about this?

or is is clear..?

Charlie

19:12

@PedroTamaroff I don't care

>:(

Pedro Tamaroff

@KevinDriscoll Well, I didn't have my morning coffee!

Kevin Driscoll

@PedroTamaroff Ah okay. Sleep late or have another engagement? I'm not a coffee drinker myself. Quite odd for a grad student.

Pedro Tamaroff

@KevinDriscoll Come againz?

Twink

every sequence must have a subsequence that converges to a real number or to $+\infty$ or $-\infty$

Kevin Driscoll

@Pedro Just curious why you missed your morning cup

Pedro Tamaroff

19:17

@KevinDriscoll Oh, someone made tea, and I said: "Oh, why not?"

Twink

and since there are infinitely many points on the right of $x$

Kevin Driscoll

Aaaaah! Okay. Didn't quite do it for you? @Pedro

Twink

that would define a sequence

Pedro Tamaroff

@KevinDriscoll Not at all. =D

Kevin Driscoll

@Pedro I'm a tea drinker, but not for the caffine

Twink

19:18

so there must be a subsequence of that sequence that converges

Danny

oh it was that simple

Pedro Tamaroff

@KevinDriscoll I am a coffee junkie.

There, I admited it!

Danny

but does it matter if it is a subsequence or not

Twink

the possibilities $y=+\infty$ and $y=-\infty$ are not excluded

of course

Danny

we can just say that either

Twink

19:19

it matters

Pedro Tamaroff

@Danny What are you discussing?

Kevin Driscoll

It's okay @Pedro you're among friends here. And quite possibly a number of fellow addicts

Danny

$s_n$ converges to $+\infty$ or to some point

Twink

we are discussing Theorem 3.17 of Rudin @PedroTamaroff

Danny

pedro some theorems of Rudin

Twink

19:20

no Danny

Pedro Tamaroff

@Twink Checks...

Twink

$s_n$ may not converge to any real number nor to $+\infty$

Danny

oh

Twink

but there will always be a subsequence

that converges either to a real number, or diverges to $+\infty$ or $-\infty$

it's part (b) of Theorem 3.17 @PedroTamaroff

Pedro Tamaroff

$(i)$ We have $s^\ast \in E$ and $(ii)$ If $x>s^\ast$ there is an integer $N$ such that $n\geqslant N$ implies $s_n<x$?

Twink

19:22

@Danny asked why there is such a $y$

Danny

ok!

Twink

part (b)

what'sup

hello

Twink

Pedro will explain it better @Danny

Danny

no it was good explanation ! the only thing

Pedro Tamaroff

19:24

@Twink Oh, I guess you put it out clearly.

Danny

does every sequence have a convergent subsequence?

$+ infty $ included

Pedro Tamaroff

@Danny If you admit infinite limits, yes.

Twink

and $-\infty$ included too

Danny

is there a theorem about this...

Pedro Tamaroff

@Danny Bolzano-Weiertrass.

Danny

19:26

sorry for asking so much . iam a beginner

Twink

take a look at theorem 3.6

Pedro Tamaroff

Plus the fact that if $\langle x_n\rangle$ is unbounded then it has a sequence "converging" to $+\infty$ or $-\infty$.

Twink

it handles the case where the space $X$ is compact

that is Bolzano-Weierstrass theorem

Danny

yes

but is $\mathbb{R}^k$compact?

Twink

look at part (b)

a bounded sequence always has a convergent subsequence

convergent means it converges to a real number

Danny

19:28

hold

Twink

and as Pedro said

if it's unbounded

Danny

ok !! i think i get it

we can put it in two cases

Twink

there is a subsequence that converges to $+\infty$ or $-\infty$

Danny

either it is bounded then it converges

Twink

yes, boundedn, and unbounded

Danny

19:29

or it is unbounded then it converges to +- $\infty$

thanks pedro and twins! , were are you guys from?

Twink

Danny see part (a) of Theorem 3.17

Danny

yes?

Twink

they handle the case that $s_n$ is unbounded

Alizter

Hello people of chat room

Kevin Driscoll

Howd @alizter

Twink

19:32

they say: "$s_n$ is not bounded above, and there is subsequence convergins to $+\infty$

Danny

yes. give me a moment

Twink

just that sentence

they're saying what we just told you

so, there are 2 subcases

Kevin Driscoll

Is {1,1,1,1,1,......} a subsequence of {1,-1,1,-1,1,-1,1,.......}?

Twink

if $s_n$ is not bounded above, there is a subsequence converging to $+\infty$

and if $s_n$ is not bounded below, there is a subsequence converging to $-\infty$

Danny

yes!!

Twink

19:37

if $s_n$ is not bounded above nor below, there are at least two subsequences one converging to $+\infty$ and one converging to $-\infty$

yes @KevinDriscoll

it's the subsequence $s_{2n-1}$

Danny

Twink what do u study?

Twink

math and you?

Danny

haha

yeah

i mean what courses

Twink

measure theory and linear algebra

Danny

okey i see

Kevin Driscoll

19:40

So in the sequence $s_n = (-1)^{n+1}$ the subsequence $s_{2n-1}$ 'converges' to $+\infty$ and the subsequence $s_{2n}$ 'converges' to $-\infty$........kind of odd

Danny

are you from US? twink

Kevin Driscoll

errrr sums I mean

Pedro Tamaroff

@KevinDriscoll Well, no.

What you want is $0$ and $1$ as limits.

Kevin Driscoll

@Pedro Ya I meant the elements sum to those values, not that the sequence goes to those values

Pedro Tamaroff

@KevinDriscoll Note the partial sums are $1,0,1,0,1,0,1,0,\ldots$.

No $\infty$ possible.

Kevin Driscoll

19:43

@Pedro are you not allowed to rearrange the terms?

Pedro Tamaroff

@KevinDriscoll That is another story, dawg. We're talking subsequences here.

Kevin Driscoll

Ya, I realized

Pedro Tamaroff

YARLY!

Kevin Driscoll

Oh okay. Can't change the order of the elements when going from a sequnece to its subsequence. Didn't know that

Pedro Tamaroff

@KevinDriscoll Right. Subsequences $x_{n_i}$ are meant to satisfy $n_{i}<n_{i+1}$.

Twink

19:49

What about $1-\frac{1}{2}+\frac{2}{3}-\frac{1}{3}+\frac{2}{4}-\frac{1}{4}+\frac{2}{5}-\frac{1}{5}+\frac{2}{6}-\frac{1}{6}+\cdots$?

is it $\sum_{n=2}^\infty \frac{1}{n}$?

can I just associate the terms like that?

Kevin Driscoll

$\sum_{n=2}^{\infty} \frac{1}{n}$ I think you mean

Alizter

What is the ZFC representation of a limit?

Twink

yes

masfenix

Hello guys, just a quick question. Does the function $f(x) = exp(\frac{-1}{x})$ for $x < 0$ belong to Schwartz space?

Twink

thanks

can I do that @PedroTamaroff?

Pedro Tamaroff

19:53

@Alizter What...?

Kevin Driscoll

@masfenix The definition of $S$ that I've seen requires the function to be defined on all of $\mathbb{R}$

Pedro Tamaroff

@Twink What you're doing is looking at $a_1,a_3,a_5,\ldots,$ if I am not crazy.

Kevin Driscoll

@masfenix but I'm not an expert. If its reasonable to define it only on $x<0$ then it seems like it should be.

Twink

no I'm just trying to find the limit of that series

masfenix

@KevinDriscoll Thanks

Twink

19:56

but I was wondering if I can associate the terms like that

Kevin Driscoll

@masfenix Actually no

Twink

and get the series with $1/n$

Kevin Driscoll

@masfenix I wasa wrong, just looked at a graph. It doesn't decrease as $x \to -\infty$ fast enough

Twink

or isn't it permitted?

masfenix

I am actually a little bit confused about Shwartz spaces. Could you give me a little intuition on them?

Pedro Tamaroff

19:57

@Twink You have found one subsequence converging to $+\infty$. That's a start.

So if the sum converges it must go to $+\infty$.

Can you show this?

Twink

is that a subsequence of the partial sums sequence? :S

Kevin Driscoll

@masfenix They're the space of all functions that are infinitely differentiable and both the function and the derivatives decrease faster than ANY power of $x$ as $x \to \pm \infty$

Pedro Tamaroff

@Twink Yes.

Alizter

If everything can be represented with ZFC what about $\lim_{x\to0}f(x)$

Transcript for

$Mathematics$ Mathematics